Answer:
[tex]G=0.5\pm0.005[/tex]
Explanation:
The specific gravity is given by,
[tex]G=\frac{D_S}{D_W}=\frac{500}{1000} =0.5[/tex]
Now, in order to calculate the uncertainty (relative error) in G, we must first take log (base e) on both sides of the equation,
[tex]lnG=ln(\frac{D_S}{D_W} )=lnD_S-lnD_W[/tex]
Differentiating the above equation,
[tex]\frac{dG}{G}=\frac{dD_S}{D_S}[/tex]
The second term is zero because it is known that [tex]D_W=1000kg/m^3[/tex] and hence a constant.
Putting the appropriate values, we get,
[tex]\frac{dG}{G}=\frac{dD_S}{D_S}=\frac{5}{500} =0.01[/tex]
Therefore, uncertainty in G = [tex]0.01\times0.5=0.005[/tex]
